Concept
No-deleting theorem
Concepts associés (8)
No-communication theorem
In physics, the no-communication theorem or no-signaling principle is a no-go theorem from quantum information theory which states that, during measurement of an entangled quantum state, it is not possible for one observer, by making a measurement of a subsystem of the total state, to communicate information to another observer. The theorem is important because, in quantum mechanics, quantum entanglement is an effect by which certain widely separated events can be correlated in ways that, at first glance, suggest the possibility of communication faster-than-light.
Categorical quantum mechanics
Categorical quantum mechanics is the study of quantum foundations and quantum information using paradigms from mathematics and computer science, notably . The primitive objects of study are physical processes, and the different ways that these can be composed. It was pioneered in 2004 by Samson Abramsky and Bob Coecke. Categorical quantum mechanics is entry 18M40 in MSC2020. Mathematically, the basic setup is captured by a : composition of morphisms models sequential composition of processes, and the tensor product describes parallel composition of processes.
No-broadcasting theorem
In physics, the no-broadcasting theorem is a result of quantum information theory. In the case of pure quantum states, it is a corollary of the no-cloning theorem. The no-cloning theorem for pure states says that it is impossible to create two copies of an unknown state given a single copy of the state. Since quantum states cannot be copied in general, they cannot be broadcast. Here, the word "broadcast" is used in the sense of conveying the state to two or more recipients.
No-teleportation theorem
In quantum information theory, the no-teleportation theorem states that an arbitrary quantum state cannot be converted into a sequence of classical bits (or even an infinite number of such bits); nor can such bits be used to reconstruct the original state, thus "teleporting" it by merely moving classical bits around. Put another way, it states that the unit of quantum information, the qubit, cannot be exactly, precisely converted into classical information bits.
Impossibilité du clonage quantique
Le théorème d'impossibilité du clonage quantique est un résultat de mécanique quantique qui interdit la copie à l'identique d'un état quantique inconnu et arbitraire. Il a été énoncé en 1982 par Wootters, Zurek, et Dieks. Ce théorème a d'importantes conséquences en informatique quantique. Par exemple, il fait en sorte qu'il est impossible d'adapter un code quantique directement du code de répétition de la théorie des codes classique. Ceci rend la tâche d'élaborer un code quantique difficile par rapport aux codes classiques.
Quantum information science
Quantum information science is a field that combines the principles of quantum mechanics with information science to study the processing, analysis, and transmission of information. It covers both theoretical and experimental aspects of quantum physics, including the limits of what can be achieved with quantum information. The term quantum information theory is sometimes used, but it does not include experimental research and can be confused with a subfield of quantum information science that deals with the processing of quantum information.
Téléportation quantique
La téléportation quantique est une technique de transfert d'informations quantiques qui consiste à transférer l’état quantique d’un système vers un autre système similaire et distant, sans avoir besoin de transporter physiquement le système lui-même. En d'autres termes, c'est un moyen de transmettre l'information contenue dans un système quantique à un autre endroit, sans avoir à déplacer le système physique.
Information quantique
La théorie de l'information quantique, parfois abrégée simplement en information quantique, est un développement de la théorie de l'information de Claude Shannon exploitant les propriétés de la mécanique quantique, notamment le principe de superposition ou encore l'intrication. L'unité qui est utilisée pour quantifier l'information quantique est le qubit, par analogie avec le bit d'information classique.